Geodesic-pancyclic Graphs
Hung-Chang Chan, Jou-Ming Chang, Yue-Li Wang, and Shi-Jinn Horng
Discrete Applied Mathematics, Vol. 155, No. 15 (2007) pp. 1971-1978.

The above article has been cited by the articles listed below.
  1. Hong-Chun Hsu, Pao-Lien Lai, Chang-Hsiung Tsai, Geodesic pancyclicity and balanced pancyclicity of augmented cubes, Information Processing Letters 101 (2007) 227-232.

  2. T. H. Ku, J. S Lin, Yue-Li Wang, R.C.T Lee, Embedded triangular graphs, Proceedings of the 24th Workshop on Combinatorial Mathematics and Computation Theory, Nantou, Taiwan, April 27-28, 2007, pp. 273-277.

  3. Jyun-Hong Guo, Lingling Huang, Geodesic pancyclicity and balanced 5-pancyclicity of 3-ary n-cube, Proceedings of the 25th Workshop on Combinatorial Mathematics and Computation Theory, Hsinchu, Taiwan, April 25-26, 2008, pp. 80-86.

  4. Hsien-Yang Liao, Chien-Hung Huang, Jywe-Fei Fang, The Geodesic bipancyclicity of the hypercube, Proceedings of the 25th Workshop on Combinatorial Mathematics and Computation Theory, Hsinchu, Taiwan, April 25-26, 2008, pp. 101-107.

  5. Chang-Hsiung Tsai, Jheng-Cheng Chen, Pao-Lien Lai, Hong-Chun Hsu, Optimal geodesic cycles embedding of Mobius cubes, Proceedings of the 25th Workshop on Combinatorial Mathematics and Computation Theory, Hsinchu, Taiwan, April 25-26, 2008, pp. 269-275.

  6. Hung-Chang Chan, Jou-Ming Chang, Yue-Li Wang, Shi-Jinn Horng, Geodesic-pancyclicity and fault-tolerant panconnectivity of augmented cubes, Applied Mathematics and Computation 207 (2009) 333-339. (*)

  7. Pao-Lien Lai, Chang-Hsiung Tsai, Hong-Chun Hsu, Embedding geodesic and balanced cycles into hypercubes, WSEAS Transactions on Mathematics 8 (2009) 341-350.

  8. Pao-Lien Lai, Chang-Hsiung Tsai, Hong-Chun Hsu, Geodesic and Balanced Bipancyclicity of Hypercubes, The 8th WSEAS International Conference on Applied Computer Science and Applied Computational Science, HangZhou, China, May 2009, pp. 44-49 (*)

  9. Jywe-Fei Fang, Yi-Wei Hsu, Yi-Chung Lin, Xiao-Peng Huang, Hong-Ren Chen, Balanced pancyclicity of the generalized base-b hypercube, Proceedings of the 27th Workshop on Combinatorial Mathematics and Computation Theory, Taichung, Taiwan, April 30 - May 1, 2010, pp. 216-222.

  10. Pao-Lien Lai, Geodesic pancyclicity of twisted cubes, Information Sciences 181 (2011) 5321-5332. (*)

  11. Jywe-Fei Fang, Chien-Hung Huang, Geodesic pancyclicity and balanced pancyclicity of the generalized base-b hypercube, Discrete Applied Mathematics 160 (2012) 548-559. (*)

  12. Dyi-Rong Duh,Tzu-Lung Chen, Yue-Li Wang, (n-3)-edge-fault-tolerant weak-pancyclicity of (n, k)-star graphs, Theoretical Computer Science 516 (2014) 28-39. (*)

  13. Zhenming Bi, Ping Zhang, On k-path pancyclic graphs, Discussiones Mathematicae Graph Theory 35 (2015) 271-281. (*)

  14. Hon-Chan Chen, Tzu-Liang Kung, Yun-Hao Zou, Hsin-Wei Mao, The fault-tolerant Hamiltonian problem of crossed cubes with path faults, IEICE Transactions on Information and Systems E98-D (2015) 2116-2122. (*)

  15. Emlee W. Nicholson, Bing Wei, Degree conditions for weakly geodesic pancyclic graphs and their exceptions, Journal of Combinatorial Optimization 31 (2016) 912-917. (*)

  16. Huazhong Lu, Guangfu Wang, Geodesic-bipancyclicity of balanced hypercubes, International Journal of Computer Mathematics: Computer Systems Theory 2 (2017) 121-135.

  17. Hon-Chan Chen, Tzu-Liang Kung, Lih-Hsing Hsu, An augmented pancyclicity problem of crossed cubes, Computer Journal 61 (2018) 54-62. (*)

  18. Zhenming Bi, Ping Zhang, On sharp lower bounds for panconnected, geodesic-pancyclic and path pancyclic graphs, Journal of Combinatorial Mathematics and Combinatorial Computing 107 (2018) 285-297.

  19. Zhenming Bi, Highly Hamiltonian Graphs and Digraphs, Dissertations 3143, Western Michigan University (2017).

  20. Amruta V. Shinde, Y.M. Borse, Geodesic bipancyclicity of the Cartesian product of graphs, Theory and Applications of Graphs 9 (2022) Article 6.

Times cited: 9 (from Web of Science)